Math, asked by ansivaparvathi993, 1 month ago

can anyone answer this pls
maths

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Answered by SparklingBoy

A Binomial Expression of Index 9 :

${\bigg( {\text x}^{2} - \dfrac{1}{\text x} \bigg)}^{9} \\$

If n is any natural number and a , b are any numbers , then in the expansion of $\sf(a + b)^n$ (p + 1)th term is given by : .

$\large\pink{ \bf T_{p+1}={}^{p} C_{r}.{( a)}^{n - p}.( {b)}^{p}} \\$

Let (r + 1)th Term be the Term independent of x.

As We Know,

$\large\bf T_{r+1}={}^{n} C_{r}. {( a)}^{n- r}.( {b)}^{r} \\$

$\large = \sf{}^{9} C_{r}. ( {{x}^{2})}^{9 - r} . \bigg(- \frac{ 1}{x} \bigg)^{r} \\$

$= \sf{}^{9} C_{r}.( - 1)^{r}.({{x)}^{2(9 - r)}} . \bigg(\frac{ 1}{x} \bigg)^{r} \\$

$= \sf{}^{9} C_{r}.( - 1)^{r}.({{x)}^{(18 - 2r)}} . \bigg(\frac{1}{x ^{r} } \bigg)\\$

$= \sf{}^{9} C_{r}.( - 1)^{r}.({{x)}^{(18 - 2r - r)}} \\$

$\red{:\longmapsto\bf T_{r+1}={}^{9} C_{r}.( - 1)^{r}.({{x)}^{(18 - 3r)}}} \\$

★ As it is independent of x so power of x should be zero.

$:\longmapsto18 - 3\text r = 0 \\$

$:\longmapsto3\text r = 18 \\$

$:\longmapsto\text r = \cancel\dfrac{18}{3} \\$

$\purple{ \Large :\longmapsto \underline {\boxed{{\bf r = 6} }}}$

★ According to our Assumption

(r + 1)th term is independent of x,

Hence,

$\bold{{Term \: independent \: of \: x =(6 + 1)th }}$

So,

$\large\underline{\pink{\underline{\frak{\pmb{\text Term \: independent \: of \: x =7th }}}}}$

Answered by Atlas99

$\huge{\underline{\mathtt{\red{★REFER \: }\pink{THE} \: \green{ATTACHMENT} \: \blue{FOR} \: \purple{FULL} \: \orange{SOLUTION★}}}}$

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